Image scaling using real scale factors

ABSTRACT

A method for performing scaling of a video image uses a noninteger scale factor. The scaling using a series of images scaled according to integer powers of two. An integer scale factor is applied to the image to be scaled in order to provide a series of scaled images. A determination is made which scaled image is the closest image to the one corresponding to the fractional scale factor. The scaled image selected in this manner is then operated upon using an interpolation to obtain the value corresponding to the fractional scale factor. Alternatively, the two scaled images which are closest to the image corresponding to the fractional scale factor may be selected and an interpolation operation or an averaging operation of the two scaled images may be performed to obtain the factional scale image. The scaled images may be predetermined during off-line operations so that a plurality of image selections may be performed upon the same set of predetermined scaled images.

BACKGROUND OF THE INVENTION

1. Field of the Invention

This invention relates to the field of video processing and in particular to the interpolation of pixels within a video processing system.

2. Background Art

The use of pixel interpolation is well known in the field of video processing because in this field a great deal of pixel data must be stored, encoded, transmitted, decoded, scaled and shifted. So much pixel data is operated upon in video processing that even storing and retrieving the data are difficult. For example, D. L. Sprague, N. J. Fedele and L. D. Ryan in a U.S. patent application Ser. No. 918,275, filed Oct. 14, 1986, entitled "Non-Dedicated Image Memory Using Separate Bit-Map Organizations For Luminance and Chrominance Variables", describe a system for retrieving stored images in digital form from video random-access memory (VRAM).

The VRAM taught in Sprague et al. is a dual-ported memory including a dynamic random-access memory with a random-access read/write port. It also includes a relatively small, auxiliary, static, serial memory with a serial output port. The storage locations of the auxiliary memory may be loaded with pixel information in parallel from any row of storage locations in the larger dynamic memory upon command. Thereafter the auxiliary memory has its storage locations scanned by a counter operating as an address generator and it is read out in a shift register operation to supply a stream of video data.

In the system of Sprague et al., the pixels to be interpreted are described in terms of luminance and chrominance components. Each of the components has its own bit-map organization associated therewith in the dynamic memory portion of VRAM. Groups of bits descriptive of the luminance or chrominance of a pixel are stored together in a conformal mapping of the display in a bit-map-organized memory. The luminance components are generally more densely sampled in image field space than the chrominance components are. This is done to conserve image memory, recognizing that visual acuity for chrominance is less than that for luminance.

The VRAM is linearly packed. This means that the raster scanning of pixel codes is stored in successive rows of the dynamic memory. Rows in dynamic memory do not necessarily have a 1:1 correspondence with scan lines in the ultimate display. A formatter known as a "pixel unwrapper" takes a stream of data supplied to it from the VRAM serial output port and passes it into scan lines of successive pixel codes.

During line trace intervals in the display, VRAM supplies data from its output port. From this data the pixel-unwrapper generates a stream of pixel codes describing luminance in real time. During selected line retrace intervals in the display, VRAM supplies data from its serial output port from which data the pixel unwrapper generates two streams of pixel codes describing chrominance in a compressed-in-time and advanced-in-time format.

Each stream of chrominance components may be supplied to a respective chrominance re-sampling apparatus. Each resampling apparatus may comprise a respective odd-line line-storage memory, a respective even-line line-storage memory and a pixel interpolator.

Successive lines of each stream of compressed chrominance data are selected on an alternating basis for writing into its odd-line or its even-line line-storage memory. These line storage memories act as a rate-buffer to supply samples to their interpolator. The interpolator generates samples of the chrominance component with compression removed and with delay to temporally align them with the real-time luminance samples.

The luminance samples and two sets of chrominance samples are converted from digital to analog form and are linearly combined, for generating red, green and blue analog video signals. These analog video signals are amplified and gamma-corrected to provide drive signals for the display apparatus, typically a color kinescope.

The Sprague, Fedele and Ryan interpolator uses a cascade of n basic interpolator blocks and a multiplexer to resample each set of supplied chrominance samples 2^(n) times more densely in both the direction of pixel scan and direction of line advance. Each basic interpolator block includes three multiplexers, three adders, two clocked unit-delay latches and bit place shift circuitry. The teaching of this device is directed to interpolator circuitry for expanding video data that can be more readily programmed to do either 2:1 or 4:1 spatial interpolation and that reduces the amount of hardware associated with spatial interpolation. However, these operations may be very computationally intensive. Therefore it is desirable to perform interpolation, such as the interpolation taught by Sprague, Fedele and Ryan, using less time and/or less hardware circuitry.

It is known in the prior art that reduction of the complexity of the interpolation problem may be achieved by manipulating the interpolation equations. The simplest form of interpolation to attempt to reduce is in the field of one-dimensional interpolation. One-dimensional interpolation involves the weighted summation of two values, for example, as expressed by the equation:

    I=xA+(1-x)B.                                               Equation (1)

In this equation A and B are the two input values to be interpolated and x is the fractional weight term. The solution of this equation requires two add/subtract operations and two multiplications.

It is known to rearrange this equation to reduce it to the following form:

    I=x(A-B)+B.                                                Equation (2)

When the basic one-dimensional interpolation equation is rearranged into this form, the solution of the interpolation requires one subtraction, one addition, and one multiplication. Thus, this rearranged form requires one less multiplication. Because this rearranged form requires fewer mathematical operations, it is advantageous to design a circuit to solve the equation in this rearranged form. This advantage can be realized in the form of decreased space requirements on the semiconductor chip or in performing the interpolation more quickly using the same amount of space. However, it is desirable to further reduce the amount of space or time required to perform the interpolation.

U.S. Pat. No. 5,148,381, entitled "One-Dimensional Interpolation Circuit and Method Based on Modification of a Parallel Multiplier", filed Feb. 7, 1991, by Sprague teaches further reduction. The method of sprague starts by assuming that the fractional weight term of the interpolation, x, is a four bit unsigned binary number. Equation (1) may be scaled by sixteen to give: ##EQU1## where:

    y=16X

and y is a four bit unsigned integer with values from zero to fifteen which may be the interpolation weight term.

Because interpolation weight term y was a four bit positive integer,

    16-y=αy+1,                                           Equation (4)

where αy is the one's complement of y wherein each bit of y is complemented. Substituting Equation (4) into the right hand side of Equation (3) provides:

    16I=yA+αyB+B.                                        Equation (5)

A circuit suitable for the implementation of Equation (5), was provided by a modified multiplier array wherein things were substituted.

An implementation of an interpolator based on Equation (5) is generally more hardware efficient than prior art implementations based on either Equation (1) or Equation (2). The implementation based on Equation (5) needs one less subtraction compared with the implementation of Equation (2) because the implementation of Equation (5) does not require the generation of the (A-B) term required by the implementation of Equation (2).

The reason for the increase in efficiency provided by Equation (5) is that adders forming a multiplier in an implementation based on Equation (2) are not fully utilized when one or more bits of weight term y are equal to zero. In the case where one or more bits of y are equal to zero, the row of adders that corresponds to a zero bit of y simply passes the partial product on to the next stage. In the implementation of the present invention based on Equation (5), each stage of adders adds either an A term or a B term of the partial product. It will be understood by those skilled in the art that Equation (5) can be implemented by hardware or software.

Even though this method performs interpolations much more efficiently, it only interpolates in one dimension and in some applications it is advantageous to interpolate in more than one dimension. For example, it is known to perform interpolations in two and three dimensions. An example of the two-dimensional interpolation is multimedia applications. In these applications scaling may be used to allow a still or a motion video image to be displayed in an arbitrarily sized window covering a portion of the display device. Many methods for multi-dimensional interpolation are known. For example, it is known to perform such multi-dimensional interpolation as a series of one-dimensional interpolations.

Referring now to FIG. 1, there is shown prior art two-dimensional bilinear pixel interpolation method 1. It is known to perform two-dimensional bilinear interpolation pixel method 1 upon four input pixels 2a-d with two interpolation weights, a horizontal interpolation weight w_(x) and a vertical interpolation weight w_(y). In bilinear pixel interpolation method 1, input pixels 2a-d are positioned horizontally and vertically adjacent with respect to each other and pixel 2f is a value between pixels 2a-d which is determined by the interpolation process.

The value of pixel 2f between pixels 2a-d may be calculated, for example, by a sequence of conventional one-dimensional interpolation. The interpolation of pixel 2a and pixel 2c to determine pixel 2e may be performed along dotted line 4 according to vertical interpolation weight w_(y). The interpolation of pixel 2b and pixel 2d to form pixel 2g may be performed along dotted line 8, also according to vertical interpolation weight w_(y). The interpolation of pixel 2e and pixel 2g to determine pixel 2f may then be performed along dotted line 6 according to horizontal interpolation weight w_(x).

The bilinear interpolation operation of method may be performed as three one-dimensional interpolations: (1) pixel 2e=(pixel 2a, pixel 2c), (2) pixel 2g=(pixel 2b, pixel 2d), and (3) pixel 2f=(pixel 2e, pixel 2g). In this formulation (pixel m, pixel n) represents a conventional one-dimensional linear interpolation between pixel m and pixel n, for example, as set forth in Equation (5). In some applications which are sequentially repeated, it is possible that only two interpolations rather than three may be performed in order to practice bilinear pixel interpolation method 1. The result of one of the one-dimensional interpolations, for example pixel 2g= (pixel 2b, pixel 2d), may be remembered from the previous two-dimensional interpolation operation.

SUMMARY OF THE INVENTIONS

A method is provided for performing scaling of a video image using a noninteger scale factor. The scaling is performed using a series of images scaled according to integer powers of two. In this method an integer scale factor is applied to the image to be scaled in order to provide a series of scaled images. A determination is made which scaled image is the closest image to the one corresponding to the fractional scale factor. The scaled image selected in this manner is then operated upon using an interpolation to obtain the value corresponding to the fractional scale factor.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 shows a prior art two-dimensional pixel interpolation method.

FIGS. 2A,B show a planar representation and a perspective representation of the three-dimensional pixel interpolation method of the present invention.

FIG. 3 shows a schematic representation of the uniform scaling two-dimensional pixel interpolation circuitry of the present invention.

FIG. 4 shows a graphical representation of a scaling down operation performed by the pixel interpolation circuitry of FIG. 3.

FIG. 5 shows a further three-dimensional pixel interpolation method of the present invention.

DETAILED DESCRIPTION OF THE INVENTION

Referring now to FIGS. 2A,B, there are shown planar and perspective representations of three-dimensional pixel interpolation method 10 of the present invention. Three-dimensional pixel interpolation method 10 receives four input pixels 14a-d which may be disposed within a first image frame F₁, and four input pixels 18a-d which may be disposed within a second image frame F₂. Pixel interpolation method 10 interpolates these eight input pixels 14a-d 18a-d to provide interpolated pixel 16 between the two parallel planes of image F₁ and image F₂.

Three-dimensional pixel interpolation method 10 of the present invention performs two-dimensional interpolations of the type previously described with respect to two-dimensional bilinear interpolation method 1. Thus, for example, pixel interpolation method 10 may perform a first one-dimensional interpolation within frame F₁, in the manner described with respect to interpolation method 1, to obtain pixel 14e=(pixel 14a, pixel 14c). A second interpolation according to interpolation method 1 may be performed to obtain pixel 14g=(pixel 14b, pixel 14d). These two results may then be interpolated by interpolation method 10 to provide pixel 14f wherein pixel 14f=(pixel 14e, pixel 14g).

Three-dimensional pixel interpolation method 10 of the present invention may then operate upon frame F₂. The operation upon frame F₂ again uses the one-dimensional interpolations of two-dimensional bilinear interpolation method 1. In this manner, pixel 18e=(pixel 18a, pixel 18c) is determined as well pixel 18g=(pixel 18b, pixel 18d). These two results may then be interpolated within frame F₂ by pixel interpolation method 10 to provide pixel 18f wherein pixel 18f=(pixel 14e, pixel 14g).

Performing these two two-dimensional bilinear operations thus provides pixels 14f, 18f within three-dimensional pixel interpolation method 10. Pixels 14f, 18f are disposed within frames F₁ and F₂ respectively. It will be understood that the two-dimensional interpolation operations performed to determine pixels 14f, 18f within interpolation method 10 require only two, rather than three, one-dimensional interpolations as previously described with respect to pixel interpolation method 1, if the result of a previous interpolation can be saved. A further one-dimensional interpolation may then be performed upon two-dimensionally interpolated pixels 14f, 18f along dotted line 20 perpendicular to the planes of frames F₁ and F₂. This further interpolation is effective to determine three-dimensionally interpolated pixel 16. It may be done with a weight w_(z) or as a simple average.

Thus it will be understood that a three-dimensional interpolation of the eight input pixels 14a-d, 18a-d to determine interpolated pixel 16, may be performed using five one-dimensional interpolations. Two one-dimensional interpolations in accordance with bilinear interpolation method 1 are required to obtain pixel 14f within frame F₁ provided that the results of a preceding one-dimensional interpolation may be saved and reused. In the same manner, two one-dimensional interpolations are required to determine pixel 18f within frame F₂ from input pixels 18a-d. The fifth one-dimensional interpolation required is the interpolation between pixel 12f and pixel 14f as previously described to obtain pixel 16 between frames F₁ and F₂.

Referring now to FIG. 3, there is shown uniform scaling two-dimensional pixel interpolation circuitry 100. Uniform scaling pixel interpolation circuitry 100 may be used to perform substantially any conventional two-dimensional interpolation. For example, pixel interpolation circuitry 100 may be used to perform the two-dimensional interpolation operations of pixel interpolation method 1 as well as the two-dimensional interpolations required to obtain pixels 14f, 18f of three-dimensional interpolation method 10. However, pixel interpolation circuitry 100 is optimized for interpolating images wherein a common interpolation scaling factor is applied along the horizontal dimension of an image and a common scaling factor is applied along the vertical dimension. The horizontal and vertical scaling factors within interpolation circuitry 100 need not be the same.

Thus uniform scaling pixel interpolation circuitry 100 is particularly useful for performing the operation of shifting video images wherein the shifting operation is performed with uniform scaling. Two-dimensional pixel interpolation circuitry 100, or uniform scaling pixel interpolation circuitry 100, may be used when shifting an image with uniform scaling by a fractional pixel distance. Thus, for example, pixel interpolation circuitry 100 may be advantageously applied to the problem of scaling and shifting images wherein a corner of an image is shifted, thereby continuously changing the aspect ratio of the image.

The scaling and shifting of images are common, for example, in the field of graphics and in the field of display windows. In the field of display windows one image may be scaled into a window within another image and the two images may be displayed simultaneously. Using uniform scaling pixel interpolation circuitry 100, a display window may be stretched into different aspect ratios by applying different uniform scaling factors to the horizontal and vertical dimensions of the image. This advantageous feature is available within uniform scaling pixel interpolation circuitry 100 because interpolation circuitry 100 permits the use of different interpolation weights in the horizontal and vertical dimensions of an image.

An input bit stream representative of a display image is received by pixel interpolation circuitry 100 by way of interpolator input line 111. The input bit stream of interpolator input line 111 is applied to block 112. The output of block 112 is applied to input of block 114. The delay of passing through block 114 may permit the signal provided at output line 120 of block 114 to be delayed by one raster scan with respect to the signal at output 118 of block 112.

For example, at time t_(i), when the output of block 114 may correspond to pixel 14c, the output of block 112 may correspond to pixel 13c. Thus, it will be understood that if the delay of block 114 is one raster scan, the pixels on output lines 118, 120 are vertically adjacent to each other. Furthermore, at some later time, time t_(i+1), the output of block 114 may represent pixel 14d, and the output of block 112 may represent pixel 14b which is vertically adjacent to pixel 14d.

Thus, when interpolation circuitry 100 processes the pixels of frame F₁, vertically adjacent output pixels 14a,c and vertically adjacent pixels 14b,d are applied to vertical one-dimensional interpolator 122 by way of vertical interpolator input lines 118, 120, respectively, at times t_(i) and t_(i+1). Also applied to vertical one-dimensional interpolator 122 is a value representative of the vertical interpolation weight w_(y). The interpolation weight w_(y) is applied by vertical interpolation weight register 116 in order to determine an interpolated value between the vertically adjacent inputs such as pixels 14a,c and 14b,d.

The interpolated output value pixel 14e=(pixel 14a, pixel 14c) of vertical interpolator 122 is then formed by interpolator 122 when pixels 14a,c of frame F₁, are applied by way of interpolator lines 118, 120. It will be understood that the same operations performed upon pixels 14a,c by one-dimensional interpolator 122 at time t_(i) to provide pixel 14e may also be performed upon pixels 14b,d at time t_(i+1), by interpolator 122 to form interpolated pixel 14g=(pixel 14b, pixel 14d).

Horizontal one-dimensional interpolator 128 receives the pixel 14e from the output of vertical one-dimensional interpolator 122 directly by way of interpolator input line 124. In addition to pixel 14e, applied directly to horizontal interpolator 128, a delayed output value from vertical interpolator 122 is applied by way of interpolator input line 127 to horizontal one-dimensional interpolator 128. The delayed value is applied to horizontal interpolator 128 by way of delay latch 126. When the delay caused by delay latch 126 is one pixel position, the interpolation of pixels 14a,c, pixel 14e, and the interpolation of pixels 14b,d, pixel 14g, are applied to horizontal interpolator 100 simultaneously.

Thus both interpolated values pixel 14e=(pixel 14a, pixel 14c) and pixel 14g=(pixel 14b, pixel 14d) may be applied to horizontal one-dimensional interpolator 128 simultaneously. Horizontal one-dimensional interpolator 128 then performs the interpolation pixel 14f=(pixel 14e, pixel 14g) to determine interpolated pixel 14f in accordance with a value representative of the horizontal interpolation weight w_(x) received by way of line 132.

Horizontal interpolation weight register 130 of pixel interpolation circuit 100 provides the interpolation weight w_(x) in accordance with a constant weight increment Δw received from weight increment register 136. The weight increment term Δw is reapplied to the weight w_(x) of line 132 at each pixel position along the horizontal dimension of a scaled image within pixel interpolation circuitry 100.

At each such position, summing node 134 receives the current weight value applied by horizontal weight register 130 to horizontal interpolator 128 by way of line 132. The interpolation weight increment Δx of horizontal weight register 136 is applied to summing node 134 in addition to the current weight value w_(x). The sum of the current weight value w_(x) and the weight increment Δw is then applied by interpolation weight register 130 to horizontal interpolator 128. In this manner a fixed point increment is performed on the horizontal weight at each horizontal pixel position during the scaling process within pixel interpolation circuitry 100.

The function of weight increment register 136 within pixel interpolation circuitry 100 may be performed by differential analyzers which are known to those skilled in the art. The use of weight increment register 136 within interpolation circuitry 100 eliminates the need to repeatedly recalculate the current weight term w_(x) applied to one-dimensional horizontal interpolator 128 by way of line 132.

Summing node 134 also provides a carry out signal or a weight carry signal on carry out line 138. A carry out on line 38 indicates that register 130 storing the current weight term of line 132 has crossed over zero, modulo 1. This carry-out value may be used to control conditional execution and conditional branching to permit control of the output pixel rate relative to the input pixel rate. For an example of condition execution and branching, see U.S. patent application Ser. No. 7/782,332, filed Oct. 24, 1991 by Sprague, et al, which is incorporated by reference herein. It will be understood that the operations performed upon register 130 by weight increment register 136 and summing node 134 may also be performed upon register 116 to provide uniform scaling in the vertical direction.

Referring now to FIG. 4, there is shown pixel scaling chart 170. Pixel scaling chart 170 illustrates the scaling up of four input pixels 152a-d using, for example, two-dimensional pixel interpolation circuit 100 of the present invention. It will be understood that when pixel interpolation circuit 100 scales up an image it generates more pixels in its output stream than were received in its input stream. For example, scaling up four input pixels 152a-d generates five output pixels 156a-e in the example of scaling chart 170. Furthermore, it will be understood that pixel interpolation circuit 100 is effective to scale up or to scale down depending on whether the value Δw of weight increment register 136 is greater than one or less than one.

In the beginning of the interpolation, scaled pixel value 156a may appear substantially unchanged compared with original pixel 152a if there is an initial weight value of zero in register 130. An incremental weight Δw of two-thirds is then applied by weight increment register 136 to summing node 134. The value of two-thirds is applied by summing node 134 to horizontal interpolation weight box 130 which applies the value to one-dimensional horizontal interpolator 128. This results in a weight w₁ =2/3 being applied to interpolator 128 to provide interpolated pixel 156b. Thus interpolated pixel 156b is determined by interpolating input pixels 152a,b with a weight of w₁.

The value of two-thirds which is applied by horizontal interpolation weight box 130 to horizontal interpolator 128 is also applied to summing node 134 by way of line 132. Summing node 134 adds the value two-thirds received from line 132 to the incremental value two-thirds received from box 136 to provide an output value of one-third with a carry out of one on carry out line 138. Thus, interpolated pixel 156c is determined using an interpolation weight w₂ =1/3. The carry out provided by summing node 134 signals a system processor that the interpolation is to be performed upon the next pair of input pixels, pixels 152b,c. It will be understood that interpolation has thus proceeded from pixels 152a,b to pixels 152b,c in response to the signal of the carry-out line 138.

The value of one-third applied to one-dimensional horizontal interpolator 128 is also applied to summing node 134 as previously described. Summing node 134 adds the value one-third received from line 132 to the value two-thirds received from weight box 36 to provide a sum of zero with another carry-out of one on carry out line 138. The sum of zero is placed in box 130 and applied to one-dimensional interpolator 128. The carry-out of line 138 signals the processor to use the next pair of input pixels, pixels 152c,d. However, since the weight received by horizontal interpolator 28 is w₃ =0 the resulting interpolated pixel 156d is not changed with respect to input pixel 152c.

It will be understood by those skilled in the art that the weights w₁, w₂, w₃ provided within two-dimensional pixel interpolation circuit 100 repeat from this point forward. For example, weight w₄ determined by summing node 134 is equal to weight w₁. Weight w₅ is equal to weight w₂. Furthermore, the interpolation operations advance from one pair of adjacent pixels to the next pair of adjacent pixels in the same manner as described with respect to pixels 152a-d.

These results are summarized in Table 1 for Δw=2/3. In the preferred embodiment the Δw may be limited to the range 0.5≦Δw≦2. Multiple passes may thus be used to obtain the closest factor of two and a fractional scale value may be used to obtain the final image size as set forth hereinbelow.

                  TABLE 1                                                          ______________________________________                                                                      Interpolated                                      Output Pixel Weight    C.sub.o                                                                              Pixel                                             ______________________________________                                         56a          w.sub.o = 0                                                                              0     52a,b                                             56b          w.sub.1 = 2/3                                                                            0     52a,b                                             56c          w.sub.2 = 1/3                                                                            1     52b,c                                             56d          w.sub.3 = 0                                                                              1     52c,d                                             56e          w.sub.4 = 2/3                                                                            0     52c,d                                             ______________________________________                                    

Referring now to FIG. 5, there is shown two-dimensional interpolation method 225. Two-dimensional interpolation method 225 of the present invention is useful for the purpose of scaling video images using scaling factors which are not reciprocal integer powers of two. Using this method original image 250 is first scaled down by one-half to generate smaller filtered image 252. Filtered image 252 may then be scaled down by one-half to provide smaller filtered image 256. Filtered image 256 may then be scaled down by one-half to provide smaller filtered image 258. It is possible to provide any number of successive filtered images which are decreased in size by one-half each time by repeatedly filtering horizontally and vertically by a factor of two.

Thus using only the type of successive scaling down by one-half described thus far yields only scaling wherein the scaling factor is a reciprocal integer power of two, such as filtered image 252, having a scaling factor of 1/2 times, filtered image 256, having a scaling factor of 1/4 times, and filtered image 258, having a scaling factor of 1/8 times. However, based upon images 250, 252, 256 two-dimensional interpolation method 225 of the present invention may be used to provide scaling which is not limited to integer scaling factors.

For example, starting image 250 may be scaled down with a scaling factor of 1/3.5 times to determinate interpolated image 254. In order to scale starting image 250 down by a factor which is not an integer power of two, a determination is made which integer scaling factor is the closest to the desired one. It will be understood that the two scaling factors closest to 1/3.5 times are 1/2 times and 1/4 times. Thus, the closest filtered images to the required interpolated image 254 are filtered images 252, 256 which correspond to scaling factors 1/2 times and 1/4 times.

The method of the present invention may then be performed in either of two directions. Method 225 of the present invention may start with filtered image 252 and scale down to interpolated image 254 as indicated by arrow 253. Alternately method 225 may start with filtered image 256 and scale up to image 254. Less information is lost if interpolation starts with the filtered image 252 and scales down.

In the preferred embodiment of the method of the present invention, off-line processing of starting image 250 is performed using very high order filters (not shown) to generate video images 252, 256, 258. High order filters of the type required for this purpose are well known to those skilled in the art. Then a high-speed interpolation system is provided for arbitrary scaling between any two of the integer reciprocal scale factors to generate images between images 250, 252, between images 252, 256 and between images 256, 258. For example, interpolation methods 1, 10 and uniform scaling pixel interpolation circuitry 100 may be used for providing a weighted interpolation image. Alternatively, a simple average between the two adjacent images may be performed.

While this invention has been described with reference to specific and particularly preferred embodiments thereof, it is not limited thereto and the appended claims are intended to be construed to encompass not only the specific forms and variants of the invention shown but to such other forms and variants as may be devised by those skilled in the art without departing from the true scope of this invention. 

We claim:
 1. A method for scaling an input image, comprising the steps of:(a) selecting a scale factor X, wherein 2^(n) <X<2^(n+1) and n is an integer; (b) selecting a scale factor Y, wherein Y is one of 2^(n) and 2^(n+1) ; (c) scaling the input image according to the scale factor Y to generate a first scaled image; and (d) scaling the first scaled image according to the scale factor X to generate an output image.
 2. The method of claim 1, wherein n is a negative integer.
 3. The method of claim 1, wherein n is a positive integer.
 4. The method of claim 1, wherein the input image is a video image.
 5. The method of claim 1, wherein Y is the one of 2^(n) and 2^(n+1) that is closest to the scale factor X.
 6. The method of claim 1, wherein step (b) comprises the step of selecting a scale factor Y, wherein Y is the larger of 2^(n) and 2^(n+1).
 7. The method of claim 1, wherein step (c) is performed off-line.
 8. The method of claim 1, wherein step (c) comprises the step of successively scaling the input image by a factor of two until the input image is scaled by the scale factor Y to generate the first scaled image.
 9. The method of claim 8, wherein the successive scaling of step (c) is performed using high order filtering.
 10. The method of claim 9, wherein:the input image is a video image; n is a negative integer; Y is the larger of 2^(n) and 2^(n+1) ; and step (c) is performed off-line.
 11. A system for scaling an input image, comprising:(a) means for selecting a scale factor X, wherein 2^(n) <X<2^(n+1) and n is an integer; (b) means for selecting a scale factor Y, wherein Y is one of 2^(n) and 2^(n+1) ; (c) means for scaling the input image according to the scale factor Y to generate a first scaled image; and (d) means for scaling the first scaled image according to the scale factor X to generate an output image.
 12. The system of claim 11, wherein n is a negative integer.
 13. The system of claim 11, wherein n is a positive integer.
 14. The system of claim 11, wherein the input image is a video image.
 15. The system of claim 11, wherein Y is the one of 2^(n) and 2^(n+1) that is closest to the scale factor X.
 16. The system of claim 11, wherein Y is the larger of 2^(n) and 2^(n+1).
 17. The system of claim 11, wherein means (c) comprises means for successively scaling the input image by a factor of two until the input image is scaled by the scale factor Y to generate the first scaled image.
 18. The system of claim 17, wherein means (c) further comprises high order filter means for scaling the input image by a factor of two.
 19. The method of claim 18, wherein:Y is the larger of 2^(n) and 2^(n+1) ; n is a negative integer; and the input image is a video image. 